Recurrence among trees with most numerous efficient dominating sets

Graphs and Algorithms International audience A dominating set D of vertices in a graph G is called an efficient dominating set if the distance between any two vertices in D is at least three. A tree T of order n is called maximum if T has the largest number of efficient dominating sets among all n-vertex trees. A constructive characterization of all maximum trees is given. Their structure has recurring aspects with period 7. Moreover, the number of efficient dominating sets in maximum n-vertex trees is determined and is exponential. Also the number of maximum n-vertex trees is shown to be bounded below by an increasing exponential function in n.

Download Full-text

Graphs with Constant Sum of Domination and Inverse Domination Numbers

International Journal of Combinatorics ◽

10.1155/2012/831489 ◽

2012 ◽

Vol 2012 ◽

pp. 1-7 ◽

Cited By ~ 1

Author(s):

T. Tamizh Chelvam ◽

T. Asir

Keyword(s):

Minimum Degree ◽

Dominating Set ◽

Domination Number ◽

Complete Characterization ◽

Dominating Sets ◽

Minimum Cardinality ◽

Connected Graphs ◽

Vertex Set ◽

Domination Numbers

A subset D of the vertex set of a graph G, is a dominating set if every vertex in V−D is adjacent to at least one vertex in D. The domination number γ(G) is the minimum cardinality of a dominating set of G. A subset of V−D, which is also a dominating set of G is called an inverse dominating set of G with respect to D. The inverse domination number γ′(G) is the minimum cardinality of the inverse dominating sets. Domke et al. (2004) characterized connected graphs G with γ(G)+γ′(G)=n, where n is the number of vertices in G. It is the purpose of this paper to give a complete characterization of graphs G with minimum degree at least two and γ(G)+γ′(G)=n−1.

Download Full-text

Infinite graphs with finite dominating sets

Discrete Mathematics Algorithms and Applications ◽

10.1142/s1793830917500537 ◽

2017 ◽

Vol 09 (04) ◽

pp. 1750053 ◽

Cited By ~ 1

Author(s):

Angsuman Das

Keyword(s):

Dominating Set ◽

Infinite Graphs ◽

Dominating Sets ◽

Connected Graphs ◽

Infinite Trees ◽

Product Graphs ◽

Finite Dominating Sets

In this paper, we study the infinite graphs which admit a finite dominating set. The main contribution of the work is two folds: (i) characterization of infinite trees and hence infinite connected graphs with a finite dominating set, (ii) it is shown that apart from a family of graphs, all infinite graphs or their complements possess a finite dominating set. Moreover, some conditions of existence of finite dominating sets in product graphs are studied.

Download Full-text

Domatically full Cartesian product graphs

Asian-European Journal of Mathematics ◽

10.1142/s1793557122501571 ◽

2021 ◽

Author(s):

Suguru Hiranuma ◽

Gen Kawatani ◽

Naoki Matsumoto

Keyword(s):

Minimum Degree ◽

Dominating Set ◽

Cartesian Product ◽

Dominating Sets ◽

Set Partition ◽

Cartesian Products ◽

Domatic Number ◽

Product Graphs ◽

Number Formula

The domatic number [Formula: see text] of a graph [Formula: see text] is the maximum number of disjoint dominating sets in a dominating set partition of a graph [Formula: see text]. For any graph [Formula: see text], [Formula: see text] where [Formula: see text] is the minimum degree of [Formula: see text], and [Formula: see text] is domatically full if the equality holds, i.e., [Formula: see text]. In this paper, we characterize domatically full Cartesian products of a path of order 2 and a tree of order at least 3. Moreover, we show a characterization of the Cartesian product of a longer path and a tree of order at least 3. By using these results, we also show that for any two trees of order at least 3, the Cartesian product of them is domatically full.

Download Full-text

Minimal distributions in a stochastic partial ordering and bounds for Gaussian processes

Journal of Applied Probability ◽

10.1017/s0021900200023780 ◽

1983 ◽

Vol 20 (03) ◽

pp. 529-536

Author(s):

W. J. R. Eplett

Keyword(s):

Gaussian Process ◽

Gaussian Processes ◽

Partial Ordering ◽

Boundary Crossing ◽

Conditional Probabilities ◽

Life Distribution ◽

Life Distributions ◽

Bounded Below ◽

Crossing Probabilities

A natural requirement to impose upon the life distribution of a component is that after inspection at some randomly chosen time to check whether it is still functioning, its life distribution from the time of checking should be bounded below by some specified distribution which may be defined by external considerations. Furthermore, the life distribution should ideally be minimal in the partial ordering obtained from the conditional probabilities. We prove that these specifications provide an apparently new characterization of the DFRA class of life distributions with a corresponding result for IFRA distributions. These results may be transferred, using Slepian's lemma, to obtain bounds for the boundary crossing probabilities of a stationary Gaussian process.

Download Full-text

On the star forest polytope for trees and cycles

RAIRO - Operations Research ◽

10.1051/ro/2018076 ◽

2019 ◽

Vol 53 (5) ◽

pp. 1763-1773

Author(s):

Meziane Aider ◽

Lamia Aoudia ◽

Mourad Baïou ◽

A. Ridha Mahjoub ◽

Viet Hung Nguyen

Keyword(s):

Undirected Graph ◽

Dominating Set ◽

Discrete Math ◽

Complete Characterization ◽

Facial Structure ◽

Maximum Weight ◽

Single Node ◽

End Node ◽

Vertex Disjoint

Let G = (V, E) be an undirected graph where the edges in E have non-negative weights. A star in G is either a single node of G or a subgraph of G where all the edges share one common end-node. A star forest is a collection of vertex-disjoint stars in G. The weight of a star forest is the sum of the weights of its edges. This paper deals with the problem of finding a Maximum Weight Spanning Star Forest (MWSFP) in G. This problem is NP-hard but can be solved in polynomial time when G is a cactus [Nguyen, Discrete Math. Algorithms App. 7 (2015) 1550018]. In this paper, we present a polyhedral investigation of the MWSFP. More precisely, we study the facial structure of the star forest polytope, denoted by SFP(G), which is the convex hull of the incidence vectors of the star forests of G. First, we prove several basic properties of SFP(G) and propose an integer programming formulation for MWSFP. Then, we give a class of facet-defining inequalities, called M-tree inequalities, for SFP(G). We show that for the case when G is a tree, the M-tree and the nonnegativity inequalities give a complete characterization of SFP(G). Finally, based on the description of the dominating set polytope on cycles given by Bouchakour et al. [Eur. J. Combin. 29 (2008) 652–661], we give a complete linear description of SFP(G) when G is a cycle.

Download Full-text

k-Efficient domination: Algorithmic perspective

Discrete Mathematics Algorithms and Applications ◽

10.1142/s1793830922500513 ◽

2022 ◽

Author(s):

Mohsen Alambardar Meybodi

Keyword(s):

Decision Problem ◽

Dominating Set ◽

Polynomial Time Algorithm ◽

Time Algorithm ◽

Chordal Graphs ◽

Sparse Graphs ◽

Fpt Algorithm ◽

Domination Problem ◽

Efficient Dominating Set ◽

Np Complete

A set [Formula: see text] of a graph [Formula: see text] is called an efficient dominating set of [Formula: see text] if every vertex [Formula: see text] has exactly one neighbor in [Formula: see text], in other words, the vertex set [Formula: see text] is partitioned to some circles with radius one such that the vertices in [Formula: see text] are the centers of partitions. A generalization of this concept, introduced by Chellali et al. [k-Efficient partitions of graphs, Commun. Comb. Optim. 4 (2019) 109–122], is called [Formula: see text]-efficient dominating set that briefly partitions the vertices of graph with different radiuses. It leads to a partition set [Formula: see text] such that each [Formula: see text] consists a center vertex [Formula: see text] and all the vertices in distance [Formula: see text], where [Formula: see text]. In other words, there exist the dominators with various dominating powers. The problem of finding minimum set [Formula: see text] is called the minimum [Formula: see text]-efficient domination problem. Given a positive integer [Formula: see text] and a graph [Formula: see text], the [Formula: see text]-efficient Domination Decision problem is to decide whether [Formula: see text] has a [Formula: see text]-efficient dominating set of cardinality at most [Formula: see text]. The [Formula: see text]-efficient Domination Decision problem is known to be NP-complete even for bipartite graphs [M. Chellali, T. W. Haynes and S. Hedetniemi, k-Efficient partitions of graphs, Commun. Comb. Optim. 4 (2019) 109–122]. Clearly, every graph has a [Formula: see text]-efficient dominating set but it is not correct for efficient dominating set. In this paper, we study the following: [Formula: see text]-efficient domination problem set is NP-complete even in chordal graphs. A polynomial-time algorithm for [Formula: see text]-efficient domination in trees. [Formula: see text]-efficient domination on sparse graphs from the parametrized complexity perspective. In particular, we show that it is [Formula: see text]-hard on d-degenerate graphs while the original dominating set has Fixed Parameter Tractable (FPT) algorithm on d-degenerate graphs. [Formula: see text]-efficient domination on nowhere-dense graphs is FPT.

Download Full-text

p-box: a new graph model

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2121 ◽

2015 ◽

Vol Vol. 17 no. 1 (Graph Theory) ◽

Author(s):

Mauricio Soto ◽

Christopher Thraves-Caro

Keyword(s):

Graph Theory ◽

Graph Model ◽

Directed Path ◽

Outerplanar Graphs ◽

New Model ◽

Model Based ◽

Representative Element ◽

International Audience ◽

Graph Families

Graph Theory International audience In this document, we study the scope of the following graph model: each vertex is assigned to a box in ℝd and to a representative element that belongs to that box. Two vertices are connected by an edge if and only if its respective boxes contain the opposite representative element. We focus our study on the case where boxes (and therefore representative elements) associated to vertices are spread in ℝ. We give both, a combinatorial and an intersection characterization of the model. Based on these characterizations, we determine graph families that contain the model (e. g., boxicity 2 graphs) and others that the new model contains (e. g., rooted directed path). We also study the particular case where each representative element is the center of its respective box. In this particular case, we provide constructive representations for interval, block and outerplanar graphs. Finally, we show that the general and the particular model are not equivalent by constructing a graph family that separates the two cases.

Download Full-text

Classes of graphs with restricted interval models

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.263 ◽

1999 ◽

Vol Vol. 3 no. 4 ◽

Author(s):

Andrzej Proskurowski ◽

Jan Arne Telle

Keyword(s):

Maximum Clique ◽

Interval Graphs ◽

Induced Subgraph ◽

Graph Theoretic ◽

Graph Classes ◽

International Audience ◽

Forbidden Induced Subgraph ◽

Nested Hierarchy ◽

Graph Families

International audience We introduce q-proper interval graphs as interval graphs with interval models in which no interval is properly contained in more than q other intervals, and also provide a forbidden induced subgraph characterization of this class of graphs. We initiate a graph-theoretic study of subgraphs of q-proper interval graphs with maximum clique size k+1 and give an equivalent characterization of these graphs by restricted path-decomposition. By allowing the parameter q to vary from 0 to k, we obtain a nested hierarchy of graph families, from graphs of bandwidth at most k to graphs of pathwidth at most k. Allowing both parameters to vary, we have an infinite lattice of graph classes ordered by containment.

Download Full-text

New Bounds on the Double Total Domination Number of Graphs

Bulletin of the Malaysian Mathematical Sciences Society ◽

10.1007/s40840-021-01200-0 ◽

2021 ◽

Author(s):

A. Cabrera-Martínez ◽

F. A. Hernández-Mira

Keyword(s):

Minimum Degree ◽

Dominating Set ◽

Domination Number ◽

Total Domination ◽

Dominating Sets ◽

Total Domination Number ◽

Minimum Cardinality ◽

Total Dominating Set

AbstractLet G be a graph of minimum degree at least two. A set $$D\subseteq V(G)$$ D ⊆ V ( G ) is said to be a double total dominating set of G if $$|N(v)\cap D|\ge 2$$ | N ( v ) ∩ D | ≥ 2 for every vertex $$v\in V(G)$$ v ∈ V ( G ) . The minimum cardinality among all double total dominating sets of G is the double total domination number of G. In this article, we continue with the study of this parameter. In particular, we provide new bounds on the double total domination number in terms of other domination parameters. Some of our results are tight bounds that improve some well-known results.

Download Full-text

Distance Domination and Distance Irredundance in Graphs

The Electronic Journal of Combinatorics ◽

10.37236/953 ◽

2007 ◽

Vol 14 (1) ◽

Cited By ~ 9

Author(s):

Adriana Hansberg ◽

Dirk Meierling ◽

Lutz Volkmann

Keyword(s):

Lower Bounds ◽

Connected Graph ◽

Dominating Set ◽

Domination Number ◽

Dominating Sets ◽

Minimum Cardinality ◽

Distance Domination

A set $D\subseteq V$ of vertices is said to be a (connected) distance $k$-dominating set of $G$ if the distance between each vertex $u\in V-D$ and $D$ is at most $k$ (and $D$ induces a connected graph in $G$). The minimum cardinality of a (connected) distance $k$-dominating set in $G$ is the (connected) distance $k$-domination number of $G$, denoted by $\gamma_k(G)$ ($\gamma_k^c(G)$, respectively). The set $D$ is defined to be a total $k$-dominating set of $G$ if every vertex in $V$ is within distance $k$ from some vertex of $D$ other than itself. The minimum cardinality among all total $k$-dominating sets of $G$ is called the total $k$-domination number of $G$ and is denoted by $\gamma_k^t(G)$. For $x\in X\subseteq V$, if $N^k[x]-N^k[X-x]\neq\emptyset$, the vertex $x$ is said to be $k$-irredundant in $X$. A set $X$ containing only $k$-irredundant vertices is called $k$-irredundant. The $k$-irredundance number of $G$, denoted by $ir_k(G)$, is the minimum cardinality taken over all maximal $k$-irredundant sets of vertices of $G$. In this paper we establish lower bounds for the distance $k$-irredundance number of graphs and trees. More precisely, we prove that ${5k+1\over 2}ir_k(G)\geq \gamma_k^c(G)+2k$ for each connected graph $G$ and $(2k+1)ir_k(T)\geq\gamma_k^c(T)+2k\geq |V|+2k-kn_1(T)$ for each tree $T=(V,E)$ with $n_1(T)$ leaves. A class of examples shows that the latter bound is sharp. The second inequality generalizes a result of Meierling and Volkmann and Cyman, Lemańska and Raczek regarding $\gamma_k$ and the first generalizes a result of Favaron and Kratsch regarding $ir_1$. Furthermore, we shall show that $\gamma_k^c(G)\leq{3k+1\over2}\gamma_k^t(G)-2k$ for each connected graph $G$, thereby generalizing a result of Favaron and Kratsch regarding $k=1$.

Download Full-text